Hamiltonian laceability on edge fault star graph

Taiwan, ROC December 17-December 20

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http://doi.ieeecomputersociety.org/10.1109/ICPADS.2002.1183373

Ninth International Conference on Par ...

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	Tseng-Kuei Li, Jimmy J. M. Tan, Lih-Hsing Hsu, "Hamiltonian laceability on edge fault star graph," Parallel and Distributed Systems, International Conference on, pp. 23, Ninth International Conference on Parallel and Distributed Systems (ICPADS'02), 2002.

	BibTex	x
	@article{ 10.1109/ICPADS.2002.1183373, author = {Tseng-Kuei Li and Jimmy J. M. Tan and Lih-Hsing Hsu}, title = {Hamiltonian laceability on edge fault star graph}, journal ={Parallel and Distributed Systems, International Conference on}, volume = {0}, year = {2002}, issn = {1521-9097}, pages = {23}, doi = {http://doi.ieeecomputersociety.org/10.1109/ICPADS.2002.1183373}, publisher = {IEEE Computer Society}, address = {Los Alamitos, CA, USA}, }

	RefWorks Procite/RefMan/Endnote	x
	TY - CONF JO - Parallel and Distributed Systems, International Conference on TI - Hamiltonian laceability on edge fault star graph SN - 1521-9097 SP EP A1 - Tseng-Kuei Li, A1 - Jimmy J. M. Tan, A1 - Lih-Hsing Hsu, PY - 2002 KW - star graph KW - hamiltonian laceable KW - strongly hamiltonian laceable KW - hyper hamiltonian laceable KW - fault tolerant. VL - 0 JA - Parallel and Distributed Systems, International Conference on ER -

Tseng-Kuei Li, Ching Yun Institute of Technology

Jimmy J. M. Tan, National Chiao Tung University

Lih-Hsing Hsu, National Chiao Tung University

The star graph is an attractive alternative to the hypercube graph. It possess many nice topological properties. Edge fault tolerance is an important issue for a network since the edges in the network may fail sometimes. In this paper, we show that the n-dimensional star graph is (n -3)-edge fault tolerant hamiltonian laceable, (n -3)-edge fault tolerant strongly hamiltonian laceable, and (n -4)-edge fault tolerant hyper hamiltonian laceable. All these results are optimal in a sense described in this paper.

Index Terms:

star graph, hamiltonian laceable, strongly hamiltonian laceable, hyper hamiltonian laceable, fault tolerant.

Citation:

Tseng-Kuei Li, Jimmy J. M. Tan, Lih-Hsing Hsu, "Hamiltonian laceability on edge fault star graph," icpads, pp.23, Ninth International Conference on Parallel and Distributed Systems (ICPADS'02), 2002

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